Electrical test structure and method for measuring the relative locations of conductive features on an insulating substrate

ABSTRACT

A test structure for submicrometer metrology as used in integrated circuit manufacture comprises a bridge conductor divided into three segments by pairs of voltage taps. A first segment has no intermediate taps; a second segment has a number of dummy taps intermediate its ends; and a third segment has a single central tap, which may typically be formed in a different step than the remainder of the test structure, intermediate its ends. Preferably, the central tap extends from the same side of the bridge conductor as the taps at the ends of the third segment thereof. In order to evaluate a manufacturing operation, for example, to monitor the accuracy of registration of successive manufacturing steps, test signals are applied successively between the pairs of pads. Comparison of the response of the first and second segments to the test signals allows evaluation of the segment-shortening effect of the taps; comparison of the response of the two portions of the third segment to the test signals allows evaluation of their lengths, and thus of the offset, that is, the accuracy of registration of the step used to form the central tap. 
     A plurality of substantially identical test structures are formed, for example, on an integrated circuit substrate. Offsets measured with respect to each of the substrates are summed using a least-squares technique, to allow separation of tool-wide misalignment errors and errors in the generation of a particular pattern or similar tool used to form a test structure. By summing the offsets measured with respect to a large number of test structures, random errors due to the presence of dust or other contaminants on the tools are effectively eliminated. 
     The test structure according to the invention may also be used to calibrate optical measurements, or may be implemented as a line scale for direct optical measurements.

CROSS REFERENCE TO RELATED APPLICATIONS

This application is a continuation-in-part of U.S. patent application Ser. No. 07/852,439, filed Mar. 13, 1992, now U.S. Pat. No. 5,383,136, and of Ser. No. 08/236,202, filed Apr. 28, 1994 (Attorney's Docket No. NIST 14) now U.S. Pat. No. 5,602,492.

FIELD OF THE INVENTION

The present invention is directed to submicrometer feature placement metrology, for verifying patterns used in fabrication of semiconductor integrated circuits and the like. More particularly, the invention is directed to methods and structures for measuring the relative separation of conductive features formed in one or more manufacturing steps, while eliminating effects of systematic imperfections in test structures.

The invention disclosed and claimed according to the present continuation-in-part application is directed to provision of a line scale for measurement of distance, calibrated in a manner fully traceable to an absolute measurement standard.

BACKGROUND OF THE INVENTION

As is well known, semiconductor manufacturing processes, as used to manufacture integrated circuits (ICs), involve a succession of fabrication operations requiring accurate registration of the tools used in each operation with the semiconductor wafer being processed. More specifically, successful semiconductor manufacturing requires highly accurate alignment of features on masks used in photolithographic processes, such that overlying successive mask-defined patterns of material are located on the wafer with accuracy in the low tens of nanometers range. Lithographic tools with such capabilities are being developed, but the metrology to routinely monitor and evaluate the performance of these new tools is lagging. Specifically, electrical test structures--that is, structures formed using the same tools and techniques used to manufacture the product of interest, but designed to have known and readily measurable characteristics, to allow evaluation of the manufacturing process--are needed. See Buehler et al U.S. Pat. Nos. 4,516,071 and 4,918,377, and Thomas U.S. Pat. No. 3,974,443, providing low-cost test structures for evaluating the accuracy of manufacturing steps during the advanced stages of process development and during manufacturing. However, the test structures shown in these documents are inadequate to meet current needs.

There are three principal classes of applications of test structures of interest here. In a first class of application, where the test structure is used for evaluation of accuracy of pattern generation feature placement, the entire test structure is replicated in a single conducting film on the substrate after it is imaged by a steered beam and then developed in an overlying resist film. When, for example, the serial printing of the features of the test structure during manufacture is interrupted by repositioning of the workpiece with respect to the printing equipment, the test structure allows the evaluation of the accuracy of placement of the features printed prior to the interruption with respect to those printed subsequently. The extracted relative placement of local features enables comparison with their specified relative placement. This comparison provides a significant figure of merit for pattern generation tool performance evaluation.

In a second class of applications, where the test structure is used to evaluate overlay extraction for tool alignment capability evaluation, and for mapping the local overlay (i.e., mismatch) of features on a pair of masks, two different complementary patterns, together constituting the test structure, are exposed with the same tool into the same single resist film prior to development of the composite image and its replication in an underlying conducting film. The test structure enables measurement of any local mismatch in the overlay of the two exposures. If, for example, the two exposures are made using two respective masks, and the contributions to the observed overlay originating in the patterning of the masks are known or are insignificant, then the tool alignment performance may be extracted. Conversely, when the tool-induced contribution to overlay is insignificant or is separately extracted, then the local overlay of the two masks can be measured. When the location of features in the resist by the first mask defines a reference grid, overlay mapping then enables the evaluation of feature placement on the second mask, which may be an x-ray lithography reticle, for example.

A third class of applications, where the test structure is used for mapping the local overlay of two levels in a standard or nonstandard IC wafer fabrication process, involves measurement of the alignment of features on a mask to those on a substrate that is pre-patterned with a conducting film. An important application is measuring the alignment of vias (i.e., holes extending through an insulating layer or the like) with respect to an underlying metal interconnect layer. The process used to fabricate the test structure typically includes at least two separate etch and two separate photolithographic steps. However, the entire test structure may still be replicated in a single conducting film which is patterned twice. See J. J. LaBrie, B. Fay, M. A. Blanco, K. M. Monahan, J. T. Chen, D. F. Kyser, "Characterization of Two Level Overlay in X-Ray/Optical Stepper Mix and Match Lithography", SPIE Vol. 775, Integrated Circuit Metrology, Inspection, and Process Control (1987).

The prior art includes numerous electrical test structures useful in one or more of the classes of applications described above. A first type of electrical test structure, termed the "differential linewidth bridge" or "cross-bridge resistor" has been used for measurement of electrical linewidth. See U.S. Pat. No. 3,974,443 to Thomas, and U.S. Pat. No. 4,516,071 to Buehler, and M. G. Buehler, S. D. Grant, and W. R. Thurber, "Bridge and van der Pauw Sheet Resistors for Characterizing the Linewidths of Conducting Layers", J. Electrochem. Soc., Vol. 125, pp. 650-654 (1978). Using a differential linewidth bridge for overlay measurement enables the extraction and mapping of the local overlay of two patterns from the difference in linewidth of a pair of closely separated, parallel, linear features. The respective features are replicated on the substrate by splitting lengthwise, with a second exposure, a single linear feature defined by a first exposure.

An example of the steps used in forming such a split bridge test structure is shown in FIG. 1. FIG. 1(a) shows a first pattern, e.g., used to form conductive material on a substrate. FIG. 1(b) shows a second similar pattern used similarly. If the two patterns are properly aligned, the pattern of FIG. 1(c) results. To test the relative alignment, currents can be forced between the conductive pads 10 of the lower pattern and 12 of the upper pattern by applying test voltages therebetween. If the two exposures were properly aligned, the conductors 14 and 16 connecting the pads 10 and 12, respectively, will be of equal width, and hence will conduct equal current.

Using this technique, Y. Kuroki, S. Hasegawa, T. Honda, and Y. Iida, "X-ray Exposure Mask Accuracy Evaluation Using Electrical Test Structures", Proc. IEEE International Conference on Microelectronic Test Structures, Vol. 4, No. 1, 123-127, March 1991 report resolutions of better than 100 nm in overlay metrology in double mask processing. B. Fay and T. Hasan, "Electrical Measurement Techniques for the Characterization of X-Ray Lithography Systems", Solid State Technology, pp. 239-243, May 1986 and C. J. Ashton, "Differential Linewidth Structures for overlay Measurements at 0.25 Micron Ground Rules", SPIE Vol. 775, Integrated Circuit Metrology, Inspection and Process Control, p. 201 (1987) demonstrate comparable results in a single conducting film.

However, there are limitations on use of this technique. Its use for the first class of applications discussed above is technically cumbersome, and it is process-incompatible with the third class of applications. of course, it may still be used in multilevel applications where a nonstandard IC fabrication process sequence is acceptable. The differential linewidth bridge technique can also be used to evaluate manufacturing techniques in the second class of applications discussed above, although there the two complementary patterns must be imaged in positive resist.

A second significant limitation of the differential linewidth bridge technique is that the evaluation of the accuracy of placement, that is, the accuracy of the overlay of successive operations, is only as accurate as the linewidth measurement. More specifically, in conductors having smaller dimensions, the distinction between the actual or "physical" linewidth of a tap connected to a principal conductor and its measured or "electrical" linewidth becomes significant. In uniform films, the correspondence between physical and electrical linewidths tends to be very good even into the submicrometer region. It is not necessary to use test structures having submicrometer geometries when measuring comparative linewidths for the purpose of determining overlay. In fact, submicrometer linewidths may actually be deleterious in this application because what is actually extracted in a linewidth bridge measurement is the average electrical linewidth along the length of the bridge. This length is typically at least 100 μm. The relationship of this extracted average to the variation in the actual local linewidth at different points along its length, as a consequence of material and/or processing nonuniformities, is significant. The smaller the area occupied by the test structure, the more sensitive is the extracted measurement to the effective spatial resolution. That is, the accuracy of a measurement of overlay mismatch in, for example, the x-direction, made using the differential linewidth technique, is affected by any mismatch in the y-direction. Further, the effect of mismatches in one dimension on measurements of mismatches in the other dimension increases with the minimum size of the basic structure.

A second well-known test structure used in evaluation of IC manufacturing techniques is the van der Pauw bridge shown in FIGS. 2(a)-(c). As in the case of the differential linewidth bridge of FIGS. 1(a)-(c), FIGS. 2(a) and (b) show two patterns printed in successive operations. If they are aligned correctly, the symmetrical structure of FIG. 2(c) is formed in conductive material. Its symmetry can be determined by forcing currents between various pairs of the pads 20; if uniform current flows between each pair, the two exposures were properly aligned.

Until recently, the van der Pauw resistor alignment bridge shown in FIGS. 2(a)-(c) had been used exclusively in the first and second classes of applications in which the complementary patterns were sequentially imaged in negative resist, that is, at least when the conducting film was patterned by etching. See D. S. Perloff, "A Van der Pauw Resistor Structure for Determining Mask Superposition Errors on Semiconductor Slices", Solid State Electronics 21, pp. 1013-1018 (1978). However, a more recent paper has reported on the extension of its use to a multilevel structure of the third class of application. D. W. Feldbaumer, C. J. Varker, M. Griswold, and B. J. Allen, "Design and Application of the Interlayer van der Pauw Resistor Alignment Bridge", IEEE Transactions on Semiconductor Manufacturing, Vol. 3, No. 4, pp. 206-215, November 1990. In all applications, the van der Pauw bridge offers compactness of the active area for pairs of measurements in both coordinate directions. Another advantage is that the multilevel implementation is fully IC process-compatible.

However, the absolute accuracy and precision provided by the van der Pauw bridge are comparable to that provided by other techniques only when applied to films of relatively high sheet resistivity ρ_(s). In particular, in-depth analyses provided by Perloff, supra, suggest that ρ_(s) greater than 100 Ω/sq may be necessary to reduce measurement uncertainties to below about 20 nm, for example. Both sensitivity (mV/μm) and accuracy degrade as ρ_(s) decreases. Accordingly, the application of this structure to the low sheet resistivity films used for interconnect metal could be quite difficult.

FIG. 3 reviews the salient features of the basic architecture of a third principal type of known test structure, the voltage-dividing potentiometer disclosed in D. R. Thomas and Richard D. Presson, "An Electrical Photolithographic Alignment Monitor", Digest of Papers, Government Microcircuit Applications Conference, pp. 196-197 (1974) and T. J. Russell, T. F. Leedy, and R. L. Mattis, "A Comparison of Electrical and Visual Test Structures For Evaluating Photomask Alignment in Integrated Circuit Manufacturing", Technical Digest IEDM, Washington, D.C., pp. 1-3, Dec. 5-7, 1977. Such a potentiometer provides a measurement of the displacement of a central "tap" or probe P1 between two end taps P2 and P3. If P1 is formed in a separate operation than that used to form P2 and P3, the potentiometer provides an indication of the accuracy of the alignment of the operations.

The basic test structure architecture shown in FIG. 3 is referred to herein as the "classical" voltage-dividing potentiometer. The Thomas et al and Russell et al papers, supra, describe the performance of such potentiometer-based test structures. In both cases, the reported measurement uncertainties were approximately 100 nm.

The classical voltage dividing potentiometer provided by FIG. 3 is used by forcing a current to flow between the ends of a "bridge conductor" 22, and measuring the voltage drops V₁ and V₂ between pairs of taps 24 and 26, and 24 and 28, respectively. Comparison of V₁ and V₂ indicates the relative resistance of the corresponding portions of the segment of bridge 22 between taps 26 and 28 and hence of their relative length. The "offset" x of the probe P1 as it "slides" along the bridge conductor 22, relative to the midpoint between probes P2 and P3, is determined from the relationship between the voltage drops V₁ and V₂, and the distances x and L, as a test current is forced through the bridge, according to: ##EQU1##

When the structure is implemented on IC wafers (for example), the probe P1 is referred to as the "center" tap 24, and the probes P2 and P3 are referred to as "end" taps 26 and 28. The center-to-center spacing of taps 26 and 28, L, serves as the reference length or "ruler" for the measurement of x, the "offset" of the probe P1 from the midpoint of probes P2 and P3.

The voltage-dividing potentiometer, including the enhanced version according to the invention that is described below, is readily implemented for the first, second and third classes of applications.

In order that measurements made using a voltage dividing potentiometer and analyzed according to Eq. (1) can provide a correct measurement for the offset x, that is, in order to evaluate correctly the accuracy of registration of successive manufacturing operations (for example), the taps must be electrically connected to the bridge at point contacts. If the taps are not thus connected to the bridge by point contacts, systematic errors in the extracted value of x will result from an effective shortening of the electrical bridge length due to the finite width of the contact regions connecting the taps to the bridge. The bridge can be made sufficiently long that the tap contacts are essentially point contacts relative to the bridge's length. In this limiting case, the quantity L may be approximated by Eq. (1) as the design value of the center-to-center separations of the end taps. However, when this approach is taken, random errors resulting from the extended length of the bridge, combined with micro-scale variations of the test structure composition and geometry and voltage measurement noise, limit the classical voltage-dividing potentiometer to about 0.1 μm resolution. Further, in many circumstances it is impractical to significantly extend the bridge conductor 22 to provide a large value for L.

Since the filing of parent application Ser. No. 07/852,439, (U.S. Pat. No. 5,383,136) it has been realized that errors from a number of different sources may arise during microcircuit fabrication, all resulting in improper evaluation of conductor lengths of conducting segments when determined by voltage drops across them. It would be desirable to provide a test structure whereby these various sources of error in conductor length measurements might be distinguished from one another.

For example, the art is generally aware of systematic patterning errors referred to collectively as "overlay." The "overlay" O is a vector quantity defined at every location on the substrate as the difference between the vector position P₁ of (for example) a first portion of a conductive structure on a substrate with respect to an arbitrary reference point, and the vector position of the corresponding point P₂ in an overlaying pattern, e.g., a second portion of the conductive structure. The overly O is zero when P₁ =P₂, i.e., when the composite pattern is formed correctly. For example, patterning overlay errors result when the features formed on a substrate in a second image-transfer operation are not properly located relative to features having been formed thereon in a prior operation, in which case the "overlay" has a nonzero value; nonzero overlay may also result when a feature is improperly located with respect to other features formed in the same imaging operation. Thus, nonzero "overlay" (as the term is used by the art) may derive from the misalignment of images formed sequentially by the image-transfer tooling, e.g., when two or more masks are used in sequential photolithography operations to form a resulting composite pattern on the substrate. Nonzero "overlay" may also result from errors or defects in one or more of the masks, e.g., improper placement of features on the masks.

In the parent application, a quantity "x", referred to as the "offset", was defined to be the displacement of the center tap of a potentiometer formed on a substrate in a second image-transfer operation from the midpoint between the two end taps of the potentiometer formed thereon in a prior image-transfer operation. When the displacement x was zero, the composite pattern was defined to have zero overlay. Thus the displacement x measured using the potentiometer in many cases corresponded to the overly O of the overlaying patterns forming the composite pattern, that is, when the overly O was due entirely to an error measured by the offset x. While for such potentiometers the offset x of an individual potentiometer may or may not be defined to be the same as the overly O of the composite pattern, the difference between the values of x and O will be constant in foreseeable applications. For example, when the composite pattern includes two or more potentiometers formed in the same image-transfer operations, they may exhibit different displacements x₁ and x₂, but the overlay of the composite pattern will be the same.

Microcircuit fabrication processes used to form individual or composite patterns are also susceptible to random errors caused by patterning microdefects. These may affect the reliability of overlay measurements derived from estimates of the quantity x defined previously.

The inventors have also found that corners intended to be square where conductive features meet on a substrate tend to be rounded at their inside corners, potentially contributing further errors in measurement of respective conductor lengths.

It would be highly desirable to provide a test structure from which overlay could be extracted electrically in a manner which minimized the effects of patterning microdefects through redundancy afforded by the formation of multiple potentiometers located at a single site, separated the overlay measurements into contributions deriving from feature misplacement on the masks and from misalignment of portions of composite images formed using more than one mask, and provided integral facilities for estimation of overlay introduced by imaging tools. One purpose of the last-mentioned facility would be to enable cross-referencing electrical and imaging-tool measurements of the overlay embedded in a single composite pattern.

Identification of the various sources of errors in conductor length measurements would also be useful for improvement of process quality and increasing yields of manufacturing processes.

It is common in the semiconductor manufacturing industry, and other industries, to provide a line scale, that is, a physical ruler, having divisions to allow measurement of lengths by optical comparison. Line scales are commonly provided as part of a microscope stage, in the eyepiece of a microscope, or elsewhere, for convenient measurement of features on semiconductor wafers and the like. It is currently not convenient to calibrate such line scales against an absolute length standard, such as the line scale interferometer maintained by the National Institute of Standards and Technology, assignee of the present application. It would be desirable to provide a convenient method of calibration of line scales against such an absolute length reference.

OBJECTS OF THE INVENTION

Therefore, it is a principal object of the present invention to provide a metrology tool that provides measurement of feature placement to within 10 nanometers employing conventional fabrication techniques and test equipment.

Another object of the present invention is to provide a test structure useful in evaluating multilevel registration applications.

Yet another object of the present invention is to provide an improved process and test structure for extracting the separation of parallel features at the 10 nm level, and specifically to provide means for eliminating substrate-dependent systematic errors in an electrical test structure.

It is a further object of the invention to provide a test structure and method whereby errors in conductor length measurements resulting from tool alignment mismatches, tool manufacturing errors, contamination, and inside corner rounding can be separately analyzed, for improvement of processing steps and identifying sources of inadequate yield.

It is a further object of the invention to provide a method for measurement of lengths of conductive features on a substrate suitable for correlation with measurements made using other techniques, e.g., optical microscopic or interferometric techniques, and for thereby calibrating such other types of instruments.

It is a further object of the invention to provide a line scale suitable for measurement of objects, and capable of calibration traceable directly to an absolute length reference.

SUMMARY OF THE INVENTION

A first aspect of the present invention involves a modified sliding wire potentiometer, again featuring a center tap extending from a conductive bridge between end taps extending from the bridge. A number of dummy taps, that is, taps not employed for voltage measurement in a particular measurement sequence, are also provided in an adjoining segment of the bridge, to allow the measurement of the conductor-shortening effect caused by finite tap width, and thus enabling appropriate compensation therefor. This structure permits measurement of the lateral placement of the center tap relative to the end taps with residual errors typically less than 15 nanometers.

It was further discovered by the inventors that certain systematic errors characteristic of the substrate on which the test structures are replicated could be attributed to imperfections at the inside corners of the intersections of the voltage taps with the bridge.

Therefore, according to a further aspect of the invention, the taps of the sliding-wire potentiometer all extend from the same side of the bridge. Systematic errors resulting from "inside-corner rounding" where the taps meet the bridge are substantially eliminated by this improvement. The result is a feature placement metrology tool that provides measurement of feature placement to within 10 nanometers, eliminating the systematic errors discussed above, and which can be implemented using conventional fabrication techniques and test equipment.

More specifically, the test structure according to the invention comprises a bridge conductor divided into three segments by pairs of voltage taps. A first segment has no intermediate taps; a second segment has a number of dummy taps intermediate its ends; and a third segment has an additional single central tap, which may be formed in a different operation than the remainder of the test structure, intermediate its ends. Preferably, the central tap extends from the same side of the bridge conductor as the taps at the ends of the third segment thereof. In order to evaluate a manufacturing operation, for example, to monitor any offset caused by inaccuracy of registration of a tool used in a subsequent step with respect to conductive features formed in prior steps, or to evaluate the accuracy of the tools themselves, a current is forced along the bridge conductor. The voltage drops across the three segments are measured. Comparison of the voltage drops across the first and second segments allows evaluation of the segment shortening effect of the taps; comparison of the voltage drops across the two portions of the third segment defined by the location of the central tap allows evaluation of their length, and thus of the accuracy of registration of the step used to form the central tap.

It has also been realized that "tool-wide" errors, such as errors resulting from misalignment of photolithographic "masks" used in successive operations, and "local" errors, such as misplacement of a feature within a mask, which together contribute to the overlay measured, can be separately identified if a set of offset measurements are made of a test structure comprising a number of individual test structures. According to this aspect of the invention, a number of test structures of essentially identical configuration are formed on a single substrate, in a process wherein different portions of the test structure are applied at different manufacturing steps. Analysis of offsets measured with respect to each of the test structures can be carried out to differentiate, for example, the contributions of mask misalignment errors and mask patterning errors to the total overlay, while random variations in conductor segment length measurements due to contamination or the like are effectively removed from the results. If the test structures are properly designed, according to other aspects of the invention, inside corner rounding can be effectively eliminated as a source of erroneous length measurements.

According to the invention of the present continuation-in-part application, electrical measurement techniques as employed above to measure offset and the like are also employed to calibrate a line scale thereafter used for optical measurements, for example, measurements of the features on a substrate. According to this aspect of the invention, a "prototype" line scale is formed and its length measured employing an absolute reference standard instrument, such as the line scale interferometer (LSI) maintained by the National Institute of Standards and Technology (NIST). A large number of "production" line scales are then formed, each comprising a bridge conductor subdivided by taps into a number of segments generally as described above. The taps are located so as to provide the "tick" marks of an ordinary line scale; for example, in a 10 cm line scale, taps may be provided corresponding to tick marks at 1 cm intervals, and smaller "subticks" at 1 mm intervals. The overall length of the bridge conductor of each "production" line scale is compared (typically by optical techniques) to the prototype line scale, thus establishing a compensation factor for the overall length of the line scale, as may be necessary. Electrical measurements are then made of each of the segments of the bridge conductor of each production line scale; these measurements are analyzed in accordance with the invention in order to be compensated accurately, that is, with correction for the presence of taps in segments and for inside corner rounding, if any. Such detailed electrical measurements provide a "traceable" measurement of each of the segments of the conductor, that is, the electrical measurements of the conductor can be referenced with precision via the measurement of the bridge conductor, to the LSI measurement of the prototype bridge conductor itself.

As the subdivided test structure is configured as a line scale, it can then be disposed on the stage of a microscope, in the eyepiece thereof, or elsewhere, and used to make traceable optical measurements of various objects of interest to the absolute length standard instrument.

BRIEF DESCRIPTION OF THE DRAWINGS

Other objects and advantages of the invention will become apparent upon reading the following detailed description and upon reference to the drawings, in which:

FIGS. 1(a)-(c) diagrammatically illustrate prior art techniques of differential linewidth bridge measurement;

FIGS. 2(a)-(c) diagrammatically illustrate a prior art van der Pauw resistor alignment bridge;

FIG. 3 is a diagrammatic illustration of a prior art voltage-dividing potentiometer;

FIG. 4 is a diagrammatic illustration of a first embodiment of test structure according to the invention;

FIGS. 5(a) and (b) provide diagrammatic illustration of examples of flipwise symmetrical and unsymmetrical uneven inside corner rounding (ICR);

FIG. 6 is a diagrammatic illustration of the terminology used in explaining the invention;

FIG. 7 is a graph showing data determined in testing the structure of FIG. 4;

FIG. 8 is a graph comparable to FIG. 7 of data from a second similar test;

FIGS. 9(a)-(c) provide diagrammatic partial illustrations of four embodiments of test structure architectures according to the invention;

FIG. 10 is a graph comparable to FIG. 7, showing data determined in testing the structure of FIGS. 9(a) and 9(d);

FIG. 11 is a graph comparable to FIG. 10, showing data determined in testing the structures of FIGS. 9(b) and (c);

FIG. 12 shows the layout of a typical semiconductor wafer including plural test structures according to the invention;

FIGS. 13(a)-(c) illustrate the manner in which a typical test structure may be distorted differently depending on the source of error;

FIG. 14 illustrates a test structure useful for plural measurements of offset, with plural measurements of the segment-shortening effect occasioned by the presence of taps;

FIG. 15 is an enlarged view of a portion of the test structure of FIG. 14; and

FIG. 16 shows a line scale according to the invention at near-full scale, and FIG. 16a shows an enlarged version thereof, illustrating one embodiment of a test structure/line scale adapted for electrical calibration according to one aspect of the invention;

FIG. 17 shows a detailed view of a second embodiment of an electrically calibratable optical line scale, as in FIG. 16;

FIG. 18 shows the scale of FIG. 17 in test structure/line scale configuration, i.e., having conductive traces and probes attached thereto for electrical calibration; and

FIG. 19 illustrates the principal steps in manufacture of an electrically calibrated line scale according to the present continuation-in-part application.

DESCRIPTION OF THE PREFERRED EMBODIMENT

According to one aspect of the invention, uncertainty in the measurement of the respective effective equivalent lengths of bridge conductor segments on either side of a central tap due to the finite width of taps connected to the bridge conductor is reduced; according to a second aspect of the invention, systematic errors that originate in certain common design practices are simultaneously eliminated. The first of these benefits is obtained by measuring the line-shortening effect δL due to a single tap and using δL to correct the physical center-to-center separation of the end taps L, thus determining the effective equivalent value of bridge length, for use in Eq. (1). Other measurements are then accordingly corrected. The bridge length L then no longer needs to be very long compared to the tap width, but can be made short enough to minimize random linewidth errors, and increase the sensitivity of the measurements made. The second benefit is obtained by proper arrangement of the taps used to connect the test signals to the bridge conductor.

After the line-shortening effect δL has been determined, the length L of the conductor segment can be corrected, such that the value of the offset x in FIG. 3 is given by ##EQU2##

Accurate determination of the offset x allows evaluation of the accuracy of manufacturing operations, in accordance with the objects of the invention.

FIG. 4 shows a test structure allowing determination of δL according to a first aspect of the invention. The enhanced voltage dividing potentiometer test structure shown in FIG. 4 includes a number of pads 30, numbered P₁ -P₇, and connected by conductive taps 32₁ -32₇ to a bridge conductor 34. In a typical use of the test structure of FIG. 4, the bridge conductor 34, pads P₁ -P₄, P₆, and P₇ and their associated taps 32₁₋₄, 32₆, and 32₇ are formed in a first operation, while pad P₅ and tap 32₅ are formed subsequently.

The goal of the test structure is to allow objective determination whether tap 32₅ is properly registered with respect to the taps formed earlier. This can be determined by measuring the respective distances along the bridge conductor between the intersection of the taps 32₄ and 32₆, and the intermediate tap 32₅. That is, if the tap 32₅ is centered between taps 32₄ and 32₆, it can be concluded that the two fabrication steps were, in fact, carried out in proper registration.

Distances are measured as in the prior art, that is, by forcing a current between pads P₄ and P₇ connected to respective ends of the bridge conductor 34. Voltage drops measured between pads connected to taps delimiting various segments of the bridge conductor 34 are indicative of the lengths of the segments. This use of the structure of FIG. 4 is identical to the practice of the prior art, e.g., using the structure of FIG. 3. However, as noted above, the prior art length measurements are distorted by a "line-shortening" effect caused by the finite widths of the taps; in effect, the taps reduce the local resistance of the bridge conductor, distorting measurements of its length carried out by measuring its response to test currents forced along the bridge.

According to an important aspect of the invention, the distortion in the voltage measurements caused by the finite width of taps 32 can be compensated for by adding a number of "dummy taps" 36 and measuring the effect of these on the measured length of the conductor 34. More specifically, the current-carrying ability of the conductor is distorted by the dummy taps 36 in a manner analogous to the effects of the taps 32 on the conductivity of the conductor 34. The structure of FIG. 4 allows the calculation of a length-shortening factor δL, using the following equation: ##EQU3## where n is the number of "dummy" taps between taps 32₁ and 32₂, L₁ is the design length between taps 32₁ and 32₂, L₂ is the design length between taps 32₁ and 32₆, and V_(P1-P6) and V_(P2-P1) are the voltages measured between the corresponding pads responsive to a given test current forced between the pads P₄ and P₇.

Therefore, according to one significant aspect of the invention, the fact that the taps are of finite width can be compensated for in determining the offset x by incorporating dummy taps into the design and determining δL using the equations above, that is, by comparing the voltage drops measured across first and second segments of the bridge conductor, formed with and without dummy taps, respectively. It can thus be seen that the FIG. 4 structure according to the invention provides very significant and useful results.

The inventors' experimentation with the structure of FIG. 4 indicated that while random residual errors tended to be present in the measurements of the relative offsets from a particular substrate, typically 5-15 nm, a superposed systematic error of up to 100 nm that was constant for a particular substrate but varied from one substrate to another was also noted. The latter is referred to as the Substrate Dependent Systematic Error (SDSE), and is not to be confused with the systematic error resulting from low ratios of bridge length to voltage tap contact width, which is successfully addressed by the modified potentiometer architecture according to the invention, which is presented in FIG. 4.

By comparison, SDSE is now known to depend on the preparation of the substrate and is only present to the extent that aspects of the pattern as produced do not exactly conform to the structure as designed.

The inventors have formed a model for the origin of SDSE, simulated the effects it produces, and have found the results of the simulations to match observations and measurements. Accordingly, the invention includes further improvements on the modified voltage-dividing potentiometer presented in FIG. 4, eliminating SDSE.

FIGS. 7 and 8 show data obtained by measurements carried out on two test structures corresponding to that shown in FIG. 4. FIGS. 7 and 8 graph a number of measured offsets "x_(MEAS) " (the departure of a tap 32₅ in FIG. 4 from the nominal or design location centered between taps 32₄ and 32₆) versus a variety of designed-in values for the offset ("x_(DRWN) ") to determine whether the test structure of FIG. 4 did in fact allow accurate determination of x. As can be seen from examination of FIGS. 7 and 8, while x_(MEAS) generally varies linearly with x_(DRWN), the two structures exhibited markedly different errors.

The structures from which the measurements shown in FIGS. 7 and 8 were extracted were fabricated on a single layer, and in a single pass, by a state-of-the-art electron beam primary pattern generator operating essentially accordingly to the first class of applications identified above. Therefore, actual misplacements of the center taps between the end taps of the magnitudes observed was considered highly unlikely. It was hypothesized, and subsequently confirmed by the inventors, that small variations in the magnitude and orientations of Inside Corner Rounding (ICR) occurring where the taps meet the bridge accounted for the observed effects. Specifically, the test results suggested the hypothesis that the inside corners were characterized by uneven ICR, translational symmetry, and flip-wise asymmetry. FIGS. 5(a) and (b) (discussed below) show examples of these systematic defects, while FIG. 6 illustrates parametric representations used to develop mathematical models thereof.

More specifically, a test chip containing a number of test structures based on the modified voltage-dividing potentiometer shown in FIG. 4 was designed and printed on a master chrome plate at 10× by a MEBES-76 electron beam system with 0.1 μm by 0.1 μm pixel size. The master was then stepped across working masks at 10× reduction and 10-mm stepping distances with an optical tool, providing a series of designed-in or "drawn" offsets, x_(DRWN), of 0, 10, 50 and 500 nm in a selection of test structures in each of a 10 by 10 array of chips. Two different test structures were then fabricated using this test chip, and were installed on a dc parametric tester for measurement extraction. The first test structure mask ("Mask 16") was of antireflective chrome, and the second ("Mask 11") of bright chrome.

FIGS. 7 and 8 are plots of x_(MEAS), calculated using Eq. (4) and averaged over four mask sites, versus x_(DRWN), for masks 16 and 11, respectively. Partial validation of the electrical length shortening effect of attached voltage taps, represented by Eq. (3), is illustrated; that is, the results shown in FIGS. 7 and 8 indicate that as x_(DRWN) and x_(MEAS) are linearly related, δL is in fact consistent for a given device. More specifically, the slope of each of the lines is very close to unity, indicating that the measured offset x_(MEAS) scales almost exactly linearly with the design offset x_(DRWN).

Significant nonzero y-axis intercept values in FIGS. 7 and 8 remain to be explained. For Mask 16, as shown in FIG. 7, the intercepts are in the range of 0.1 to 0.2 μm, while for Mask 11, as shown in FIG. 8, the y-intercepts are clustered around the origin. It has been discovered by the inventors that the observed intercepts are in fact substrate-dependent systematic errors (SDSE), i.e., errors in the apparent location of the offset of the center tap relative to the end taps, caused by a subtle flaw of the pattern replication process.

It was hypothesized by the inventors that the nonzero y-intercepts of the data graphed in FIGS. 7 (in particular) and 8 were due to the effects of inside corner rounding of the tap-to-bridge intersections introduced in the working mask replication process. There are two effects that inside corner rounding could have on the extracted measurement of x which would cause an apparent misplacement of the center tap consistent with the observed SDSE effects. The first occurs when the taps attached to opposite sides of the bridge are of different electrical widths at their intersections with the bridge. In this case a single value of δL, extracted from taps on one side of the bridge only, does not adequately describe the bridge length shortening effect. The second occurs if the tap-to-bridge inside corners are rounded so as to displace the effective electrical centers of the taps in an asymmetrical manner, for example, to displace the electrical centers of the taps on different sides of the bridge in different directions, or nonuniformly in the same direction. The net effect is to move the electrical center of the center tap relative to the electrical centers of the end taps. It should be emphasized that inside corner rounding per se does not render sliding wire potentiometer metrological techniques unworkable; when these effects are understood, they can be compensated for in the initial design.

A high-powered optical microscope was used to examine the extent of visible inside corner rounding, and indicated that while ICR typically varied with the corner's orientation, the ICR detected at particular tap-to-bridge intersections on the same side of the bridge and the same side of the tap appeared to be the same. That is, translationally equivalent corners had the same magnitude of corner rounding, but the corner rounding at each orientation was typically different from that at any other orientation. FIG. 5(b) gives an example of typical corner rounding found on Mask 16. Note that the ICR differed on opposite sides of the bridge conductor--that is, the ICR was flip-wise asymmetrical. Eq. (2) does not provide correct results in this case. As to Mask 11, although there was prominent ICR (as illustrated in FIG. 5(b), the ICR in this case was flipwise symmetrical, such that Eq. (2) is accurate. The comparatively increased asymmetry of the Mask 16 pattern shown in FIG. 5(b) is understood to explain qualitatively the greater value for the y-intercepts observed in the data graphed in FIG. 7 as compared to the Mask 11 data graphed in FIG. 8.

FIG. 6 illustrates the terminology used by the inventors in parameterization of the inside corner rounding effect in order to quantify the same. As can be seen in FIG. 6, when the magnitude of inside corner rounding is different on opposite inside corners of the same tap-to-bridge intersection, for example on lower side A of the bridge 34, the effective electrical center of the intersection, i.e., the "center line" of current flowing along the bridge (shown by a dotted line), is displaced laterally from the geometrical center line of the tap (shown by a solid line) by a distance δt_(A). A similar effect in the opposite direction is exhibited on the upper side B of the conductor, parameterized as δt_(B). The presence of the tap results in an effective shortening of the bridge length L by amounts δL_(A) and δL_(B). of course, the metrological objective is accurate measurement of the center-to-center separation of the extended tap line geometries, rather than that of their effective electrical centers at their respective intersections with the bridge. As long as each of any pair of taps has equal δt values, the lateral separation of the electrical centers of their intersections with the bridge is equal to the geometrical center-to-center separation of their extended lengths. This condition is expected to prevail in general as a consequence of the local translational symmetry of the feature replication process (e.g., as in FIG. 5(a)) thus rendering Eq. (2) valid. On the other hand, if each of a pair of taps have different inside corner rounding, they will have different electrical displacement values. For example, the taps on the A side of the bridge of FIG. 6 will exhibit electrical displacement with respect to the taps on the B side of the bridge; the electrical separation of the intersections will generally be different from their corresponding geometrical spacing by, in this case, the amount δt_(A) -δt_(B).

However, as noted above, inside corner rounding is only one of two contributors to the systematic error to which the (nonenhanced) modified design in FIG. 4 is vulnerable. In addition to correcting appropriately for this source of error, respective measures of the bridge-shortening parameters δL must also be extracted from dummy taps on respective sides of the bridge and used appropriately in the calculation of x.

In summary, Eq. (2) does not give a correct value for x_(MEAS) unless both δt_(A) =δt_(B) and δL_(A) =δL_(B). When δt_(A) ≠δt_(B) or δL_(A) ≠δL_(B), differential displacement and differential bridge-length shortening, respectively, will exist. The offset x is then correctly given by ##EQU4##

If respective differential quantities Δt and ΔL are defined such that Δt=δt_(A) -δt_(B) and ΔL=δL_(A) -δL_(B), and if δL is used to denote δL_(A), then Eq. (4) becomes ##EQU5##

A comparison of Eq. (5) with Eq. (2) shows that Eq. (2) is a special case of Eq. (5), i.e., where both the differential displacement At and the differential line shortening ΔL are zero. Further, Eq. (5) shows that if Eq. (2) is used where Δt and ΔL are not zero, then a plot of x_(MEAS) versus x_(DRWN), where x_(DRWN) is the corresponding actual value of x, will have a slope of unity, but an intercept, x_(o) of ##EQU6## as illustrated in FIGS. 7 and 8.

The quantity x_(o) given by Eq. (6) is, in fact, the previously described systematic error, SDSE.

The present invention includes an enhancement to the modified design shown in FIG. 4 that also eliminates SDSE. This enhancement is based on the further realization that SDSE is inherent in certain design rules, i.e., in certain common test structure configurations.

FIG. 9 shows three potentiometer-based test structure configurations that obviate the systematic error quantified in Eq. (5), together with a fourth structure, shown for comparison, which does not. For convenience, the respective configurations are referred to as the ISIS (FIG. 9(a)), YAMA (FIG. 9(b)), MOATS (FIG. 9(c)), and MOATS-X (FIG. 9(d)) designs. Each is to be understood to be disposed at the end of a longer bridge, having a number of dummy taps and two further current pads; i.e., the ISIS structure is an exemplary portion of the entire test structure in FIG. 4. Therefore, these four test structures were compared to determine their relative efficacy as metrological elements for evaluating a series of processing steps, i.e., how accurately a central conductor P1 was placed with respect to two outer conductors, P2 and P3.

The asterisks in the MOATS-X drawing in FIG. 9(d) indicate that, by using a set of three pads comprised either of pads P1, P2, and P3 or of pads P1*, P2*, and P3*, one may optionally perform a measurement equivalent to a measurement performed using the ISIS structure of FIG. 9(a) (described and referred to as ISIS* below).

As shown by data reproduced in FIGS. 10 and 11 and discussed below, the ISIS test structure (FIG. 9(a)) comprises essentially the configuration including pads P₂, P₃ and P₅ of FIG. 4, and is subject to the systematic errors (SDSE) discussed above, while the YAMA structure of FIG. 9(b) is not subject to SDSE. Essentially, the distinction between the ISIS and YAMA structures is that the center tap P1 of the ISIS structure is on the opposite side of the bridge B as the end taps P₂ and P₃, while in the YAMA structure all three taps are on the same side. The surprising result of this difference is that in the YAMA design the differential quantities Δt=δt_(A) -δt_(B) and ΔL=δL_(A) -δL_(B) are generally zero, and thus x may be extracted directly from Eq. (2).

The MOATS design is in this respect identical to the YAMA design. The difference between the MOATS and the YAMA designs is the presence in the MOATS design of tap stubs projecting across the bridge B from the voltage taps P1-P3. For applications of the first and second classes, the YAMA and MOATS structures would give essentially the same results. However, for some of the applications of the third class, the MOATS structure is advantageous in terms of manufacturability.

The MOATS-X structure (FIG. 9(d)), is a double-tapped MOATS that, firstly, enables testing of hypotheses relating to an improvement of the ISIS performance, predicted by modeling, when cross-over tap stubs are used; that is, eliminating the effect of nonzero ΔL=δL_(A) -δL_(B) by sampling the MOATS-X in the ISIS* mode (end taps on one side and the center tap on the other) as indicated by asterisks in FIG. 9(d). Secondly, the MOATS-X structure allows measurement of the "noise floor" of the primary pattern generation tool by measuring "exactly" the same offset with MOATS structures extending from opposite sides of a single line. In this context, "noise floor" refers to the uncertainty in the placement of a tap due to noise in the primary pattern generator. While some of this effect is expected to average out, there will be a limit to the perfection of replication of an inside corner.

A composite test structure was designed to facilitate as definitive as possible a comparison of the four test chip configurations. Each composite structure contained two ISIS, two YAMA, and two MOATS configurations, and one MOATS-X configuration. In the ISIS, YAMA, and MOATS configurations, one of each pair of structures was measured from the "A" side of the bridge, while the other was measured from the "B" side. Bridge segments both with and without dummy voltage taps were provided to allow measurement of the bridge electrical length shortening parameters δL.

For T-junction taps, characteristic of the ISIS and YAMA configurations, the key parameters measured are: δL_(A), the bridge electrical length shortening caused by a tap extending from the "A" side of the bridge, and δL_(B), the bridge electrical length shortening caused by a tap extending from the "B" side of the bridge. For the cross-over taps characteristic of the MOATS and MOATS-X configurations, the corresponding parameters are: δL_(AB-A), the bridge electrical length shortening caused by a tap extending from both sides of the bridge but measured from the "A" side of the bridge and δL_(AB-B), the bridge electrical length shortening caused by a tap extending from both sides of the bridge, but measured from the "B" side of the bridge.

Multiple examples of this composite test structure were located on a single test chip. Bridge lengths, L, were 8 and 12 μm. Bridge linewidths, W_(B), were 1 and 2 μm, and tap linewidths, W_(T), were 1, 2, and 4 μm. The built-in offsets, x_(DRWN), were ±0.50, ±0.25, and 0.0 μm. The test chip was printed on a 10× master chrome mask by an electron pattern generator system with a 0.1-μm by 0.1-μm pixel size. The master was then stepped across two bright chrome masks, at 10× reduction and 10-mm stepping distances with an optical tool.

The data reported herein are extracted from the structures with L=12 μm, W_(T) =2 μm, and W_(B) =1 μm. Data were taken from five composite structures (one exhibiting each value of x_(DRWN)) at two orientations, hereafter referred to as vertical and horizontal, and four chip sites on each of the two substrates, for a total of 80 composite structures. The structures were tested by forcing a test current through the bridge and measuring voltages at appropriate pads tapping into the bridge along its length.

The effective shortening of the length of the bridge segment per voltage tap, δL, was calculated following the following procedure. A voltage drop V₁ is measured across a first segment of the bridge having no intermediate taps, and of length L₁, where L₁ is the center-to-center separation of the corresponding voltage taps. The voltage drop V₂ induced by the same bridge current across a companion pair of taps with center-to-center spacing L₂ (equal to L₁) defining a second bridge segment is likewise measured, the second bridge segment having a number n of "dummy" voltage taps, such as shown at 36 in FIGS. 4. To ensure that proximity effects do not adversely affect the measurements, the spacing of the "dummy" taps is chosen to be L/2; that is, the spacing of the dummy taps was equal to one-half the length L of the third segment of the bridge 34 between the taps and connecting pads P2 and P3 to the bridge B, i.e., defining the end-tap-to-center-tap spacing of the potentiometer structure. For the extraction of δL to properly apply to the active region of the potentiometer, the design linewidths of the taps and the bridge are equal throughout.

For a constant current along the bridge, δL is then calculated using the expression ##EQU7## where V₁ is the voltage between the center pad P₁ and one end pad P₂ ; V₂ is the voltage between P₁ and the opposite end pad P₃ ; and n is the number of dummy taps. As mentioned previously, four different values of δL may be extracted in this way: δL_(A), δL_(B), δL_(AB-A), and δ_(AB-B), by appropriate choice of the connecting pads.

The offset x_(MEAS) of the structure was measured in two ISIS configurations (those which the model predicts are vulnerable to systematic errors due to asymmetrical ICR), namely, the simple ISIS, shown in FIGS. 4 and 9(a), and the ISIS* defined by the asterisked pads on the MOATS-X configuration of FIG. 9(d). Values of x_(MEAS), calculated from Eq. (3) for a single composite structure on one chip, are shown for the ISIS and ISIS* structures (each having been produced in "A" and "B" examples, as indicated) in FIG. 10. The values of x_(MEAS) were determined by setting Δt=0, in lieu of its precise value which is not known, while using the appropriate values of δL. The improvement afforded simply by the cross-over taps in ISIS* is clearly achieved, in that the yintercept of the curve of x_(MEAS) versus x_(DRWN) (which ideally should be zero) is substantially reduced for the ISIS* data as compared to the ISIS data shown; however, also as expected, even the ISIS* configuration does not entirely eliminate the systematic error represented by the y-intercept, due to placement of the central tap P₁ on the opposite side of the bridge from the end taps P₂ and P₃.

To measure an unknown offset using either ISIS or ISIS*, one must still first determine by measurement the intercept of the curve of x_(MEAS) versus x_(DRWN), that is, essentially the quantity x_(o) in Eq. (6). This serves as a calibration, allowing subsequent employment of Eq. (4) (for example) to determine the unknown value of x of another, separate, test structure. However, neither the ISIS nor the ISIS* configurations are satisfactory for determining unknown x values. This is because the electron beam spot size causes an uncertainty in the placement of the features of at least ±10 nm affecting the output of the primary pattern generator and resulting in an uncertainty in the value of x_(DRWN).

The YAMA and MOATS structures, wherein the central tap is on the same side of the bridge as the end taps, avoid this problem. Data comparable to that provided for the ISIS and ISIS* structures in FIG. 10 is presented for the YAMA and MOATS structures in FIG. 11. Again, two examples ("A" and "B") were tested. The y-intercepts of the curves of x_(MEAS) versus x_(DRWN) are of the order of only 15 nm, consistent with the uncertainty in feature placement by the primary pattern generation tool.

In practical applications, therefore, the YAMA and MOATS configurations are preferred over the ISIS structure; as the systematic error is eliminated as shown by FIG. 11, the need for determination of x_(o) for calibration purposes as described above is eliminated.

Measurements from the two different sides of the same MOATS-X structure were also compared. If the primary pattern generator were able to create geometrically perfect voltage-tap cross-overs, then the same value of x for voltages measured from either side of the structure should be obtained because the ΔLs on opposite sides of the wires would be equal, and Δt and δt would be zero. Furthermore, since the same physical offset is being measured along the same length of the same bridge, there is no possibility that variations in the width of the bridge and/or of the taps would introduce spurious values of the offset. Therefore, the two measurements should give exactly the same results.

Experiment indicates that, for all sites and for all structures, the differences between measurements of the same offset x, as measured using voltage taps on the two opposite sides of the bridge, was only 7±6 nm. The value of 7 nm included instrumental error, which should be reducible through improved measurement technique, and is responsive to random patterning errors that limit the baseline capabilities of this structure for a particular fabrication technique to a minimum value estimated to be 5 nm.

FIG. 12 shows an exemplary layout for an integrated circuit wafer 64 employing test structures 62 according to the invention at each of twenty-five "chip sites" 66. In this example, twenty-five identical integrated circuit "chips" are to be formed on wafer 64, one at each chip site 66; three identical test structures 62 are formed, in the same process, at each of the twenty-five chip sites 66, in order to obtain further advantages provided by the method and test structure of the invention. FIGS. 13(a)-13(c) show, respectively, a test structure as designed, an erroneous test structure as might result from a mask pattern generation error, and a further erroneous test structure as might result from a mask misalignment error between first and second patterning operations.

More specifically, FIG. 13(a) shows an exemplary desired test structure manufactured correctly, that is, without "local" pattern generation errors or mask misalignment errors. The test structure comprises a bridge conductor 50 formed together with taps 52, 54, and 56 in a single patterning operation, such that under normal circumstances the taps are very precisely aligned with respect to one another. For example, if a current is forced along the bridge conductor 50, voltages can be measured across pairs of taps 52 and 54 and 54 and 56 to ensure that the width of the bridge conductor is consistent. In a subsequent patterning operation, a further crossing tap 58 and a tap 60 are added, such that FIG. 13(a) shows the taps 58 and 60 in their intended positions.

If it is assumed that the portion of the mask (or other tool) used for the second patterning operation exhibits a local error, such that the mask section employed to form tap 60 is displaced, the test structure shown in FIG. 13(b) might result, i.e., wherein the tap 60 is displaced from its intended position indicated by dashed line 60'. As discussed above, in a measurement of the offset of tap 60, this error will be detected; comparison of voltage drops between, for example, pairs of taps 56 and 60, and 54 and 60, will exhibit the displacement of tap 60 from its desired position as indicated by the dotted line 60'.

By comparison, if the entire mask used in the second patterning operation to form taps 58 and 60 is misaligned with respect to the previously formed portion of the test structure comprising bridge conductor 50 and taps 52, 54, and 56, the erroneous test structure shown in FIG. 13(c) might result, i.e., wherein tap 58 is displaced from its design position 58' and tap 60 is also displaced from its design position 60'. If the mask is used in a single step to form structures over the entire chip site, the error will occur over the entire chip, i.e., a common "toolwide" error will appear in the formation of all features formed in a given step by the misaligned tool at a particular chip site.

According to the invention, such tool-wide and local errors can be distinguished by offset measurement. The offsets exhibited by the test structure exhibiting local errors as exemplified by the pattern of FIG. 13(b) and the test structure exhibiting tool-wide errors with FIG. 13(c) are distinguishable from one another according to the invention, such that the corresponding faults in the manufacturing process can be identified and addressed.

As shown in FIG. 12, according to this aspect of the invention, a number of substantially identical test structures indicated generally at 62 may be formed at each of a number of chip sites 66 on an integrated circuit wafer 64, i.e., as part of a full-scale manufacturing process, or as part of a prototype process or the like. It will be appreciated by those of skill in the art that normally the area of the wafer 64 occupied by the test structures 62 will be much smaller; the test structures are shown at large scale in FIG. 12 to enable their illustration.

In the example of FIG. 12, twenty-five groups of three essentially identical test structures 62 are provided, one group at each chip site 66. The test structures 62 may be as discussed above, e.g., in connection with FIG. 4, as discussed below in connection with FIG. 14, or otherwise. According to this aspect of the invention, however, the overlay O'_(ij) of a particular test structure formed in differing manufacturing operations is measured with respect to each of the test structures 62, and is used as the input to a process whereby the least-squares sum S of the measured overlays O'_(ij) is calculated to determine values for mask misalignment errors M_(i) and pattern errors P_(j) at each location.

More specifically, for a substrate having N_(s) total sites, each having N_(p) test structures (e.g., where 3 test structures are formed at each of 25 locations, N_(s) =25 and N_(p) =3, such that 75 total structures are formed) the contributions of "tool-wide" misalignment M_(i) and of "local" tool fabrication errors P_(j) are defined to be those which minimize the quantity S, as follows: ##EQU8## where O'_(ij) is the overlay measured with respect to the structure identified by i and j, i.e., the j-th structure at the i-th location.

According to this equation, as appreciated by those of skill in the art, the sum S of the squares of the errors is minimized, resulting in an actual value O_(ij) for the overlay of each structure, and yielding values for the actual tool-wide misalignment contributions M_(i) and local errors P_(j), i.e., differentiating the tool-wide misalignment contributions M_(i) and local pattern error contributions P_(j) to O_(ij) as measured. In this analysis, the total overlay O'_(ij) measured with respect to any particular test structure 62 is the sum of the contribution M_(i) due to misalignment of a tool used in a subsequent patterning operation with respect to a structure formed in a prior patterning operation, and the contribution P_(j) of errors in the individual tool with respect to other portions of the individual tool.

According to an important aspect of the invention, the same tool is used to form a portion of the test structure added to previously-formed portions of test structures at each of a plurality of test structure locations, such as chip sites 66, so that the local error P_(j) is systematic, appearing at the same respective location in a plurality of sets of test structures. This enables the least squares analysis discussed above to separate out tool-wide errors M_(i) from local pattern manufacturing errors P_(j) Stated more generally, the M_(i) contributions to O'_(ij) for all test structures formed in a single operation are tool-wide: that is, the overlay O'_(ij) measured with respect to each test structure completed in a particular two-step operation will exhibit the same contribution M_(i) due to a misregistration of the tool used for the subsequent operation with respect to a structure formed in the previous operation. The P_(j) contribution to O'_(ij) is "local"; that is, if a portion of the tool is manufactured improperly, such that a particular feature is displaced with respect to the remainder of the tool used in the second operation, that error will affect the corresponding test structure at each chip site where that tool is used.

For example, in FIG. 12 the overall wafer comprises twentyfive chip sites, each formed to include three nominally identical test structures. The same mask is used twenty-five times (i.e., N_(s) =25), to form portions of three test structures (i.e., N_(p) =3) previously formed at each location. Therefore, if one of the three test structure generators used at each of the twenty-five locations exhibits a pattern error, the same contribution P_(j) will be contributed to the measured overlay O'_(ij) measured with respect to the same respective one of the three test structures of each of the twenty-five groups of test structures. Conversely, if the overall mask used to form one of the twenty-five groups of test structures is misaligned, each of the three overlays O'_(ij) measured with respect to that group of three test structures will include the same contribution M_(i).

Referring back to FIGS. 13(a)-(b), if the measured overlay O'_(ij) is due to an error in the pattern, the FIG. 13(b) pattern will result at each of twenty-five corresponding locations, while if the error is one of overall mask misalignment, the FIG. 13(c) pattern will result at each of the three locations at one of the twenty-five overall test locations. The fact that the two types of errors thus contribute differently to the overall measured overlay O'_(ij) allows tool misalignment errors M_(i) to be separated from pattern manufacturing errors P_(j), by minimization of S in Eq. (8) as discussed above.

Employment of a large number of nominally identical test structures at each chip site as just discussed has a further advantage. Reference was made in the above to the well known fact that semiconductor processing operations inevitably suffer defects due to the presence of dust on masks and like tools, or on the substrate. For example, if a particle of dust adheres to the substrate at a point where a conductor is to be formed, the conductor may be formed with a portion missing. On the other hand, if a particle of dust adheres to a mask intended to pattern a photoresist, a conductor may be formed having a wider portion than desired. Either can result in the conductor's length being measured erroneously, that is, an incorrect overlay may be detected.

According to the invention, however, a large number of essentially identical test structures are formed, and the measured overlays O'_(ij) from each are summed and used to separate out the mask misalignment errors M_(i) and the pattern fabrication errors P_(j), as discussed above. The process of summing over a large number of substantially identical test structures has the effect of averaging out any errors due to dust or the like; such errors will by their nature be random, and will normally have effect only on the formation of a single test structure. On the other hand, a particle of dust adhering to a tool when used in repetitive operations, such that the same feature is formed improperly at a number of locations, will be correctly detected as a problem with the tool, i.e., as a source of P_(j) error.

The processing technique discussed above, again, amounting to summing over the measured overlays O'_(ij) to determine M_(i) and P_(j) for each of a large number of test structures, thus not only allows effective differentiation between tool alignment errors and tool fabrication errors, but also eliminates the effect of individual particles of dust which might otherwise disturb the offset measurements being made.

More particularly, according to one aspect of the invention, at least three substantially identical test structures are formed at each location, for the following reason. Tool misalignment errors and tool fabrication errors can be distinguished from one another in theory using only two identical test structures, i.e., comparison of the FIG. 13(b) error with the FIG. 13(c) error is sufficient in most cases to distinguish mask alignment from pattern manufacturing errors. However, dust or the like on one of the tools used to form one part of the structure will result in an overlay being measured that is not distinguishable from pattern errors or mask alignment errors. The random presence of the dust particles will normally cause the dust to cause a length measurement error to be detected with respect to but a single test structure, such that if at least three structures are used at each location, this error will average out over a plurality of identical structures. Therefore, it is preferable to provide at least three substantially identical test structures at each location; as indicated in FIG. 12, it is better still to provide a larger number of groups of substantially identical test structures, such that line length measurement errors caused by dust are averaged over a much larger number of test structures, allowing the mask alignment errors and pattern fabrication errors to be distinguished from one another.

As shown schematically in FIG. 12, such multiple test structures consume a substantial amount of the available substrate area; although FIG. 12 shows the test structures rather larger than would normally be the case, it still would be desirable to reduce the test structure size insofar as possible.

FIG. 14 shows a test structure allowing several independent test structures effectively to be formed at a single location; the test structure of FIG. 14 might be employed at each of nine locations in FIG. 12. In essence, the test structure of FIG. 14 employs the same bridge conductor for two or more separate measurements of the offset x. (As noted above, in many cases this offset x will coincide with the overly O.) In each step the conductor shortening effect introduced by the presence of taps is first determined, and the local offset with respect to the two patterning operations is determined. The structure of FIG. 14 allows plural such measurements to be made with respect to a single portion of the bridge conductor, this being divided into several different segments, such that a particular tap may serve as a dummy tap in a first measuring step, i.e., allowing the conductor shortening effect to be measured in the first offset measuring step, using the method discussed above, and thereafter to serve as a tap for offset measurement in a subsequent offset measuring step, in which other taps serve as dummy taps. The function of individual taps therefore varies in successive measuring steps. The structure of FIG. 14 thus allows the benefits of use of a plurality of essentially identical test structures to be obtained at minimum cost in terms of substrate area consumed thereby.

The FIG. 14 test structure is again used for making electrical measurements of the lengths of segments of a bridge conductor by driving a current along the bridge and measuring the voltage drop at ends of the various segments; again, a first portion of the test structure is formed on an insulative substrate in a first operation, and the offset of a second portion added in a subsequent operation is then measured. Specifically, a bridge conductor 70 extends between pads 7 and 8, through which the current is forced. Taps 72, 74, 76, and 78 are formed in the same "Level 1" processing step; as indicated, tap 72 is connected to pad 1, tap 74 to pad 3, tap 76 to pad 5, and tap 78 to pad 6. Further, taps 72 and 76 are provided with imaging metrology extensions A and B extending to the other side of bridge conductor 70. That is, the taps 72 and 76 are extended so as to provide a reference whereby the respective locations of taps 72, 76 can be measured using an optical microscope, interferometer, or other nonelectrical instrument, for reasons discussed below. After deposition of the Level 1 material, a second Level 2 portion of the structure is added, comprising taps 80 and 82 connected respectively to pads 2 and 4 and provided with imaging metrology extensions C and D. All voltage drop measurements are made from the same side of bridge conductor 70 to minimize differential inside-corner-rounding effects, as above.

After measurements of appropriate voltage drops (e.g., V₅₆ being the voltage drop measured across pads 5 and 6), and with segment lengths L₁, L₂, and L₃ defined as indicated on FIG. 14, the bridge shortening parameters Δ₁ and Δ₂ can be determined from the following equations: ##EQU9##

Note that in the calculation of Eq. (9), the parameters Δ₁ and Δ₂ are calculated by comparison of V₅₆, measured between Level 1 taps, and V₂₄, measured between Level 2 taps. In this calculation tap 74, located between taps 80 and 82, is treated as the dummy tap. In Eq. (10) taps 80 and 82, located between the taps with respect to which the voltages are measured, serve as the dummy taps. Thus, it will be appreciated that a tap treated as a dummy tap in one particular process for measuring the conductor-shortening effect may be employed as a voltage measuring tap in a subsequent similar process.

In the event there is overlay due to a misalignment of the tool used to form the Level 2 features, taps 80 and 82 will be displaced to one side (for example) as will the corresponding imaging metrology extensions C and D. FIG. 15 shows an enlarged portion of the structure of FIG. 14 showing the offset x₁₂₃ of tap 80 formed in Level 2 from its design position, e.g., centered between taps 72 and 74 formed as part of Level 1. FIG. 15 also illustrates typical corner rounding effects, i.e., broadening of the conductors where they cross, and identifies the terminology used in the equations which follow.

The offset x₁₂₃ is calculated by the analog of Eq. (4) above, as follows: ##EQU10##

In Eq. (12), δt₁ is the distance from the physical center lines of the taps 72 and 74 formed in Level 1 from their corresponding effective electrical center lines. The sign of δt₁ is positive in Eq. (12) when the electrical center lines are to the right of the physical center lines of the corresponding taps. Similarly, the sign of δt₂, the corresponding quantity with respect to tap 80 added in Level 2, is positive when its electrical center line is located to the right of its physical center line, and the sign of offset x₁₂₃ is positive when the physical center line of the center tap 80 is to the right of the midpoint of the physical center lines of the end taps 72 and 74.

According to a further aspect of the invention, the test structure of FIG. 14 can be used to make several measurements of the overlay, by calculations generally as above, but with respect to differing combinations of the taps added in the Level 1 and Level 2 processes. More specifically, FIG. 15 illustrates the manner whereby the structure of FIG. 14 can be divided into a subportion including taps connected to pads 1, 2, and 3 for determination of offset x₁₂₃. The same process can be carried out with respect to pads 2, 3, and 4 and pads 3, 4, and 5. The effect is to separately calculate the offset of a central tap with respect to end taps. Note that in processing the voltages measured with respect to pads 1, 2, and 3, that is, to calculate the offset x₁₂₃ of tap 80 added as part of Level 2, the offset is measured for a Level 2 tap; the same is true in calculation of offset x₃₄₅. In calculation of offset x₂₃₄, however, a Level 1 tap 74 is treated as the tap exhibiting offset. Accordingly, offset common to both taps 80 and 82 added in a subsequent processing operation will make different contributions to the total measured overlay than when only tap 80 is part of the measurement, i.e., in Eq. (11) above, or when only one of the Level 2 taps exhibits offset, e.g., due to a local error in the Level 2 processing tool. In particular, the structure of FIG. 15 allows three separate estimates of the overlay to be determined, by both electrical and optical techniques.

Reference was made in the foregoing to use of the invention in calibration of imaging tools for overlay measurement. These tools are generally optical tools such as optical microscopes or the like which effectively measure the relative spacing between conductive features on a test structure by optical inspection methods. These tools are known to be subject to systematic errors called "shifts", including so-called "tool-induced shift" referring to the measuring tool's alignment, and to "wafer-induced shifts" caused by certain characteristics of the pattern under inspection. Tool-induced shifts are estimated or reducible only by repeating measurements after reorientation of the substrate being inspected, while wafer-induced shifts are estimated as part of a calibration exercise involving patterns having known overlay.

Overlay reference test patterns for imaging metrology tool calibration are not conveniently available. This is for two reasons. First, the only sources of reliable primary calibration are one-of-a-kind national resources such as the line scale interferometer coordinate measurement system of the National Institute of Standards and Technology, which is not suited for volume manufacturing. Further, wafer-induced shifts are process-dependent such that the reference material needs to be manufactured in the same way as the patterns that are being inspected. In other words, a common reference standard would only be useful with a single type of wafer fabrication process.

By comparison, electrical overlay metrology as described herein, that is, using electrical measurements carried out on test structures, does not suffer from the measuring tool-induced shift common to imaging metrology. Further, electrical overlay metrology as disclosed herein is fast and inexpensive and can be very effective in process evaluation. Its usefulness is limited to a degree by the fact that the electrical test structure has to be replicated in electrically-conductive material. This limits its utility to conductive materials; i.e., structures formed of photoresist, oxide layers, and like nonconductive materials cannot be directly evaluated.

According to recent results of the inventors, it has been found that measurement of lengths of conductive materials using electrical metrology techniques as disclosed herein are so closely comparable to those measured by the line scale interferometer as to suggest that electrical metrology can serve as an interface between the line scale interferometer absolute length-scale reference instrument and existing optical metrology equipment. That is, the prior art provides no economically feasible means for conveniently calibrating an optical metrology tool as conventionally available to an absolute length-scale reference, such as the line-scale interferometer; electrical metrology techniques according to the invention can satisfy this need.

More particularly, an electrical test structure according to the invention, employing the techniques disclosed herein for correctly compensating electrical measurements for such features as inside corner rounding and conductor length shortening due to the presence of taps as disclosed herein is useful in calibrating optical instruments for overlay measurement. One method for so doing is generally as follows.

Imaging metrology estimates of overlay are first derived using conventional imaging metrology techniques; that is, the physical positions of the extensions A-D (these constituting a conventional "bars in bars" or "frame in frame" imaging overlay measurement pattern) aligned with the electrical voltage taps shown in FIG. 14 are optically compared to their design positions to yield a number of optically-measured overlays (O.sup.φ_(ij))'. Overlays (O.sup.φ_(ij))' may include local or tool-wide contributions M_(i) and P_(j) as in the case of the comparable electrical measurements. The optical overlay measurements (O.sup.φ_(ij))' are used as described above for the case of the comparable electrical measurements (O^(e) _(ij))' to extract estimates of M.sup.φ_(i) and P.sup.φ_(i) used in turn to re-estimate the actual optically-measured overlays (O.sup.φ_(ij)).

Next, comparable overlays (O^(e) _(ij))' are measured electrically, and used as above to extract the M^(e) _(i) and P^(e) _(i) values used in turn to re-estimate the actual overlays O^(e) _(ij).

A measurement algorithm is thus used defining the "local" net feature misplacement contributions P_(j) to both overlays, such that their sums are zero; that is, it is assumed the P_(j) contributions due to tool fabrication errors are essentially random, so that their net contribution to (O_(ij) ^(e))' and (O.sup.φ_(ij))' is zero. Therefore, if there are tool-induced or wafer-induced shifts in either set of overlay measurements, they behave so as to contribute constant amounts S^(e) and S.sup.φ to the actual misregistrations M_(i) extracted from the respective sets of overlay measurements. Thus, according to this aspect of the invention, comparable contributions to the overlays are reconstructed from electrically measured overlays (O^(e) _(ij))' and from imaging metrology measurement overlays (O.sup.φ_(ij))'. The electrically measured overlays are thus generally (O_(ij) ^(e))'=M_(i) +P^(e) _(j) +S^(e) +δ^(e) _(ij) where δ_(ij) is the residual random error, while the optically measured overlay (O.sup.φ_(ij))'=M_(i) +P.sup.φ_(j) +S.sup.φ +δ.sup.φ_(ij).

As above, minimizing the sums of the squares of the electrical residual errors provides estimates of M^(e) _(i) =(M_(i) +S^(e)) and P_(j) ^(e), and M.sup.φ_(i) =(M_(i) +S.sup.φ) and P_(j).sup.φ. S^(e) -S.sup.φ, that is, the difference between the shift measured using electrical techniques and the shift measured using imaging metrology techniques, is the quantity needed for cross-referencing the two techniques. This quantity is equal to the average difference between the (M_(i) +S^(e)) and the (M_(i) +S.sup.φ) parameters extracted in separate least-square regression techniques.

Put in another way, according to the invention, actual values for the overlay O^(e) measured electrically can be determined by separating out tool-wide errors M_(i) and local errors P_(j). The tool misalignment errors M_(i) are common to both optical and electrical measurements, while the P_(j) ^(e) and P_(j).sup.φ values may differ (the optical measurements are generally insensitive to local variation in conductor width detected by electrical measurements). Accordingly, the net shift S^(e) measured using electrical techniques can be compared to the net shift S.sup.φ measured using optical inspection techniques, and used to calibrate the optical equipment.

Therefore, according to the invention a test structure is provided the integrity of which is measured electrically and which is also inspectable by imaging metrology tools. In a further embodiment, a number of test structures each exhibiting various values for overlay could be examined to determine which in fact provides the shortest conducting paths between two pads, i.e., electrical techniques can be used to determine the actual overlay. This result could then be correlated with measurements made in the same structure using optical techniques to calibrate the optical instrument.

It will be appreciated by those of skill in the art that the structure shown in FIG. 14 above allows correlation of measurements of the respective spacing of taps made optically with similar measurements made electrically. As noted above, in general electrical measurements of relative lengths of segments of a bridge conductor made according to the invention are essentially as accurate as measurements of length made using absolute length standard measurement instrumentation, such as the NIST line scale interferometer. Accordingly, such electrical measurements can be used to calibrate an optical measuring device.

According to a further aspect of the invention provided in this present continuation-in-part application, the fact that electrical measurements of the relative lengths of segments of a bridge conductor are comparable to measurements made using an interferometric technique not suitable for ordinary manufacturing processes is employed to provide an electrically calibrated line scale. The accuracy of such an electrically calibrated line scale is directly traceable to the absolute length standard interferometric device. Accordingly, such an electrically-calibrated line scale can be used in many very demanding applications, in which ordinary line scales may not be adequate.

For example, it is commonplace to place a line scale (an elongated line divided into divisions and subdivisions by tick marks, as on an ordinary ruler) on the stage of an optical microscope for direct optical measurement of features examined through the microscope. That is, a line scale is mounted on the stage of a microscope to enable direct length measurements of objects on the stage by direct optical comparison of the length of the objects to the tick marks of the scale. Crosshairs, or a series of parallel lines, may be provided in the field of view to simplify such optical measurements. Alternatively, the line scale can be built into the eyepiece of the microscope. Such line scales are also used to measure the motion of movable microscope stages. Conventionally, such line scales are made of durable materials exhibiting low coefficients of expansion, such as glass or quartz, or steel, "Invar" or "zerodur" alloys. The best quality line scales, referred to as "stage micrometers", are produced by photolithographic etching of chromium deposited on a glass or quartz substrate.

One difficulty with this practice is that such line scales are not directly calibrated; that is, while each individual line scale will typically have been formed using the same tool used to form another scale which has in fact been found within acceptable tolerance when measured with respect to a standard, in general it is prohibitively expensive to calibrate these individual line scales against an interferometric or other absolute length standard.

According to an aspect of the invention provided in the present continuation-in-part application, a line scale is formed as part of a test structure as described generally above. The overall length of each "production" test structure/line scale is measured against a "prototype" line scale which has itself been measured directly against the absolute length measurement interferometer instrument. A bridge conductor portion of each production test structure/line scale is subdivided by taps connected to pads for electrical measurement of the segments of the bridge conductor, in accordance with the invention above. In this case the taps are located so as to correspond to the tick marks subdividing the line scale itself. Voltage drops are measured across various combinations of the taps responsive to a current forced along the length of the bridge conductor. These voltage drops are compared using the teachings of the invention as above to measure the lengths of the segments of the bridge conductor between the tick marks. The electrical measurements of the length of the segments are then effectively calibrated by reference to the overall length of the bridge conductor as measured by comparison to the "prototype" line scale measured using the interferometer. The "production" line scale can then be disposed on the scale of a microscope, for example, to measure objects on the stage or to measure movement of the stage itself, may be disposed in the eyepiece of the microscope to measure objects viewed, or may be used in any of a wide variety of further applications. Measurements made thereby are directly traceable to the absolute measurement provided by the interferometer.

Stated another way, according to this aspect of the invention, the overall length of a defined portion of each line scale is measured by a technique such that this measurement is traceable to an interferometric or other absolute measurement. The same distance is then measured electrically by measuring segments of the conductor using electrical techniques as generally disclosed herein, and a calibration factor derived, thus calibrating the line scale itself vis-a-vis the interferometer. Subsequent measurements made optically using the line scale device as a ruler are calibrated accordingly and are thus directly traceable to the interferometer.

FIG. 16 shows at 100 a typical line scale which might be attached to the stage of a microscope and shows at 102 (in FIG. 16a) a greatly enlarged version thereof. As illustrated, the line scale 102 comprises a bridge conductor 104 forming a baseline divided into a number of divisions by tick marks 106, formed by taps with pads 108 attached for measurement of voltage drops along corresponding segments of the bridge conductor 104. Individual subticks 114 are provided between each of the tick marks 106. At least a first group of the subticks 114 are provided with pads 116 for similar measurement of voltages along the individual subsegments of the bridge conductor 104. A current is forced between pads 110 and 112 connected to the ends of the bridge conductor 104 and used as generally described above to measure the length of the segments and subsegments of the bridge conductor 104 defined by tick marks 106 and subticks 114, thus electrically measuring the spacing of the tick marks 106 and subticks 114. The electrical measurements are then directly calibrated by comparison of the overall length of the bridge conductor, e.g., between the zero and one-millimeter markings shown at 118, 120, as measured electrically, with respect to an absolute value for its length.

Calibration of the overall length of the portion of the bridge conductor between tick marks 118 and 120 can be performed by comparing this distance on the production line scale to a comparable feature on a prototype line scale measured using the line scale interferometer device of the National Institute of Standards and Technology, or an equivalent absolute length reference measuring instrument. Specifically, a defined portion of the bridge conductor 104, e.g., the portion between tick marks 118 and 120 on the production line scale, is compared to a feature of the prototype line scale, to derive a calibration value for all measurements of segments of the bridge conductor made electrically. The comparison of the prototype and production line scales can be made using optical comparator equipment; it will be appreciated that the possible error in such measurements, as a percentage of the overall length, is very small.

FIGS. 17 and 18 show a second embodiment of this invention, illustrating respectively a "stage micrometer" or line scale 122 as might be ultimately disposed on the stage of an optical microscope, or in the eyepiece thereof, and a precursor thereof incorporating taps connected to pads for connection of test probes for measuring individual segments of the bridge conductor in the calibration process. As discussed above in connection with FIG. 16, a bridge conductor 104 extends the length of the test structure, and is divided by tick marks 106 and subticks 114 to define a line scale allowing convenient optical measurements of an object of interest. A number of the ticks are configured as taps connected to pads 116 for measurement of voltage drops in the corresponding segments of the bridge conductor responsive to current forced therealong, to derive comparative measurements of the lengths of the various segments thereof.

A pair of van der Pauw crosses 124 (as described above) may be disposed at either end of the bridge conductor 104, beyond the line scale itself, to enable measurement of the sheet resistance and width of the bridge conductor 104. In a further aspect of the invention, taps are provided extending traversely across the bridge conductor and connected to further pads 126 such that pads 116 and 126 are disposed on opposite sides of the bridge conductor 104. Such pads and taps can be employed as van der Pauw crosses if necessary to verify that the sheet resistivity of the method of the test structure/line scale is consistent throughout, eliminating a possible uncertainty in the measurement of the lengths of the segments of the bridge conductor.

As noted above, the total length of the bridge conductor as measured electrically is then compared to the length of a prototype line scale as measured using the interferometer, to provide an absolute value for the length of segments measured electrically. This comparison provides a calibration factor, whereby individual measurements of the lengths of the segments made electrically are referenced to the overall length of the bridge conductor as measured by comparison to the prototype measured using the interf erometer. Subsequent optical measurements made by reference to the ticks formed are thus traceable to the ultimate length standard. In this way, for example, measurements of objects made by optical comparison of the object to the line scale, or measurements of motion of a microscope stage to which the line scale is affixed, are directly traceable to the reference instrument, e.g., to NIST's line scale interferometer.

FIG. 19 exemplifies a typical sequence of steps in manufacture of a number of "production" line scales according to the invention. A first "prototype" line scale is fabricated at 130 and is measured interferometrically at 132, that is, the overall length of a segment of the prototype line scale corresponding to the bridge conductor between end tick marks 118 and 120 (FIG. 16) is measured using the line scale interferometer. A plurality of production test structure/line scale devices are then fabricated at 134.

As shown in FIGS. 16 and 18, the production test structure/line scales each comprise a bridge conductor 104 serving as a baseline and a number of tick marks and subticks serving as dividing lines; a number of these tick marks comprise taps connected to pads 108 and 116. A large number of sets of voltage measurements are then made at step 134, using the techniques described above and analyzed as described above, to measure the proportional lengths of the corresponding segments of the bridge conductor. For example, the location of individual subticks with respect to surrounding ticks could be analyzed in terms of measuring the offset x thereof, that is, to determine whether a particular subtick had been located correctly, all as above.

In each case, the effect of dummy taps is determined, using, for example, subticks not connected to taps for a particular voltage measurement as dummy taps in that analysis; the conductor shortening effect δL is thus taken into account in determining the actual lengths of the segments of the bridge conductor.

These measurements of segments of the bridge conductors are made using equations generally similar to those derived in detail above. For example, assume that a 1 millimeter-long stage micrometer as shown in FIG. 18, divided into ten 100-μm major divisions, each having ten subdivisions, giving a total of 100 subdivisions, is to be calibrated. Eqs. (13) and (14) are more general equations for x derived for two segments of arbitrary design lengths L₁ and L_(r), each having arbitrary numbers n₁ and n_(r) of dummy taps. The voltages V₁ and V_(r) measured across the corresponding segments are proportional to the electrical length of the segment, i.e.,

    V.sub.1 αL.sub.1 -(n.sub.1 +1)δL+x             (13)

and

    V.sub.r αL.sub.r -(n.sub.r +1)δL-x             (13)

where the subscripts 1 and r refer to the left-hand and the righthand segments, respectively. Taking the ratio of these two equations and solving for x yields ##EQU11## Eq. (15) shows that x is a function of reference lengths L₁ and L_(r), as well as the measured voltages V₁ and V_(r).

It will be apparent to those of skill in the art that these are simple modifications of the equations shown in detail above allowing for arbitrary left and right lengths L₁ and L_(r) therein; that is, L₁ and L_(r) are selected successively to measure electrically the locations of each of the tick marks and subticks.

In a typical measurement step 136, systems of equations corresponding to Eq. (15) would be set up for each pair of measurements made with respect to a particular tap, and solved simultaneously.

When each of the segments of the bridge conductor of a "production" test structure have been thus measured electrically, the overall electrical length of the bridge conductor can be optically compared at 138 to the prototype measured using the line scale interferometer. This comparison is then used at 140 to determine a calibration factor, i.e., correlating the measurements of the segments of the bridge conductor between the end tick marks to their actual lengths.

Before supply of the line scales to an end user the pads used for electrical measurement may be removed at 142, by etching or the like, so that the line scale closely resembles that which the user is accustomed to seeing in an optical microscope or the like.

The line scale would be supplied together with a set of calibrated values for the actual spacing of the ticks and subticks, which would then be employed by the user in forming very accurate measurements of objects; that is, the user would make measurements by optically comparing the lengths of objects on a microscope stage (for example) with the ticks on the line scale, and would correct these according to the calibration values provided together with the individual line scale.

Additional uses for the techniques of electrical measurement of lengths of segments of a bridge conductor according to the invention, relying on the result that electrical measurements made according to the invention yield actual measurements of length comparable to those measured using interferometric techniques not available in ordinary manufacturing processes, will occur to those of skill in the art.

More specifically, it will be recognized by those of skill in the art that differential voltage drop measurement of conductor lengths according to the invention provide very accurate comparative measurements, that is, of the relative lengths of segments of a bridge conductor. Such voltage drop measurements are referenced to absolute length measurements according to the invention by determining the absolute length of the overall bridge conductor with respect to an absolute length scale measurement.

Thus, there has been shown and described an improved process and electrical test structure for submicrometer feature metrology substantially accomplishing the objects of the invention mentioned above.

While the invention has been described with a certain degree of particularity and with respect to certain preferred embodiments thereof, it is manifest that many changes may be made in the details of construction and the arrangement of components without departing from the spirit and scope of the disclosure. It is understood that the invention is not limited to the embodiments set forth herein, but is to be limited only by the scope of the appended claims including the full range of equivalency to which each element thereof is entitled. 

What is claimed is:
 1. A method for making and electrically calibrating a production line scale for measurement of lengths, comprising the steps of:(1) forming a pattern of conductive material on a substrate, said pattern defining:(a) an elongated bridge conductor; (b) a plurality of evenly spaced tick marks dividing a first length of said bridge conductor into equal divisions; and (c) a further plurality of subticks dividing each of said divisions into further subdivisions, a plurality of said tick marks and subticks comprising taps connected to pads, said taps subdividing said bridge conductor into segments for enabling measurement of voltage drops along corresponding segments of the bridge conductor; (2) forcing a current along said bridge conductor; (3) measuring voltage drops between pads connected to taps coinciding with ones of said tick marks and subticks; (4) determining the relative lengths of said segments of said bridge conductor responsive to said measured voltage drops, and thereby electrically determining the overall length of a defined portion of said bridge conductor; (5) measuring the overall length of said defined portion of said bridge conductor by comparison thereof to an absolute reference standard; (6) correlating said electrically determined overall length of said defined portion of said bridge conductor with the length thereof measured by comparison to said absolute reference standard; and (7) calibrating said lengths of said segments between said taps coinciding with said tick marks and subticks as determined responsive to said measured voltage drops in step (4) above responsive to said correlation.
 2. The method of claim 1, wherein said step (5) of measuring the overall length of the bridge conductor of a production line scale formed as set forth in steps (1)(a)-(c) above is performed by:forming a prototype line scale defining a feature of length approximating the overall design length of said defined portion of said bridge conductor of said production line scale; measuring the lengths of said feature of said prototype line scale employing a reference length measuring instrument; and comparing the length of said feature of the prototype line scale to the length of said defined portion of said bridge conductor of said production line scale, to determine a calibration factor employed in said correlating step (6).
 3. The method of claim 2, wherein said step of comparing is performed by optical comparison of said feature of said prototype line scale to the design length of said defined portion of said bridge conductor of said production line scale.
 4. The method of claim 1, comprising the further step of removing said taps and pads from said production line scale after performance of said step of measuring voltage drops. 